Hamid Hezari scite author profile

For small range of p > 2, we improve the L p bounds of eigenfunctions of the Laplacian on negatively curved manifolds. Our improvement is by a power of logarithm for a full density sequence of eigenfunctions. We also derive improvements on the size of the nodal sets. Our proof is based on a quantum ergodicity property of independent interest, which holds for families of symbols supported in balls whose radius shrinks at a logarithmic rate.

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C^∞spectral rigidity of the ellipse

Hezari

Zelditch

2012

Anal. PDE

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$L^p$ norms, nodal sets, and quantum ergodicity

Hezari¹,

Rivière²

2014

Preprint

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Inverse Spectral Problem for Analytic $${{(\mathbb{Z}/2 \mathbb{Z})^{n}}}$$ -Symmetric Domains in $${{\mathbb{R}^{n}}}$$

Hezari

Zelditch

2010

Geom. Funct. Anal.

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We prove that bounded real analytic domains in R n , with the symmetries of an ellipsoid and with one axis length fixed, are determined by their Dirichlet or Neumann eigenvalues among other bounded real analytic domains with the same symmetries and axis length. Some non-degeneracy conditions are also imposed on the class of domains. It follows that bounded, convex analytic domains are determined by their spectra among other such domains. This seems to be the first positive result for the well-known Kac problem, "Can one hear the shape of a drum?", in higher dimensions.

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A natural lower bound for the size of nodal sets

Hezari

Sogge

2012

Anal. PDE

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Hamid Hezari

L norms, nodal sets, and quantum ergodicity

C^∞spectral rigidity of the ellipse

$L^p$ norms, nodal sets, and quantum ergodicity

Inverse Spectral Problem for Analytic $${{(\mathbb{Z}/2 \mathbb{Z})^{n}}}$$ -Symmetric Domains in $${{\mathbb{R}^{n}}}$$

A natural lower bound for the size of nodal sets

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Hamid Hezari

L norms, nodal sets, and quantum ergodicity

C∞spectral rigidity of the ellipse

$L^p$ norms, nodal sets, and quantum ergodicity

Inverse Spectral Problem for Analytic $${{(\mathbb{Z}/2 \mathbb{Z})^{n}}}$$ -Symmetric Domains in $${{\mathbb{R}^{n}}}$$

A natural lower bound for the size of nodal sets

Contact Info

Product

Resources

About

C^∞spectral rigidity of the ellipse